Valued fields and their completions #
In this file we study the topology of a field K
endowed with a valuation (in our application
to adic spaces, K
will be the valuation field associated to some valuation on a ring, defined in
valuation.basic).
We already know from valuation.topology that one can build a topology on K
which
makes it a topological ring.
The first goal is to show K
is a topological field, ie inversion is continuous
at every non-zero element.
The next goal is to prove K
is a completable topological field. This gives us
a completion hat K
which is a topological field. We also prove that K
is automatically
separated, so the map from K
to hat K
is injective.
Then we extend the valuation given on K
to a valuation on hat K
.
The topology coming from a valuation on a division ring makes it a topological division ring [BouAC, VI.5.1 middle of Proposition 1]
Equations
- (_ : TopologicalDivisionRing K) = (_ : TopologicalDivisionRing K)
A valued division ring is separated.
Equations
- (_ : SeparatedSpace K) = (_ : SeparatedSpace K)
A valued field is completable.
Equations
- (_ : CompletableTopField K) = (_ : CompletableTopField K)
The extension of the valuation of a valued field to the completion of the field.
Equations
- Valued.extension = DenseInducing.extend (_ : DenseInducing ↑K) ⇑Valued.v
Instances For
the extension of a valuation on a division ring to its completion.
Equations
- One or more equations did not get rendered due to their size.
Instances For
Equations
- One or more equations did not get rendered due to their size.